A proof of Howard’s conjecture in homogeneous parallel shear flows |
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| Authors: | Mihir B Banerjee R G Shandil Vinay Kanwar |
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| Affiliation: | 1. Department of Mathematics, Himachal Pradesh University, 171 005, Shimla, India
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| Abstract: | A rigorous mathematical proof of Howard's conjecture which states that the growth rate of an arbitrary unstable wave must approach zero, as the wave length decreases to zero, in the linear instability of nonviscous homogeneous parallel shear flows, is presented here for the first time under the restriction of the boundedness of the second derivative of the basic velocity field with respect to the vertical coordinate in the concerned flow domain. |
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| Keywords: | Nonviscous shear flows |
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